Title: Lesson 6: pH, pOH and the Ionic Product of Water Learning Objectives: – Understand the...
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Transcript of Title: Lesson 6: pH, pOH and the Ionic Product of Water Learning Objectives: – Understand the...
Title: Lesson 6: pH, pOH and the Ionic Product of Water
Learning Objectives:– Understand the ionic product of water and use it calculate H+
and OH- concentrations
– Calculate pH
– Calculate pOH
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Ethanoic acid, CH3COOH, is a weak acid.
a. Define the term weak acid and state the equation for the reaction of ethanoic acid with water.
b. Vinegar, which contains ethanoic acid, can be used to clean deposits of calcium carbonate from the elements of electric kettles. State the equation for the reaction of ethanoic acid with calcium carbonate.
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Relationship between strength and concentration Acids and bases differ in strength according to the
equilibrium position of their ionisation reactions. Different concentrations of aqueous solution according to the
ratio of acid or base to water used.
Both factors influence the pH of a solution.
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The ionic product of water, Kw Water can be both an acid and a base, this leads to the following
equilibrium:
2 H2O H3O+ + OH- OR MORE SIMPLY... H2O H+ + OH-
The equilibrium for this reaction is called the ionic product of water and has the symbol Kw (at 298K):
Dissociation of water is ENDOTHERMIC (bond breaking) So increase in temperature will shift the equilibrium to the right
and the Kw will increase (Le Chatelier’s Principle) This will cause an increase in the concentrations of H+(aq) and
OH-(aq) and a decrease in pH A reduction in temperature will cause the opposite effect...
14101]][[ OHHKW
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Summary of effect of temperature on Kw
pH of water is only 7 at 298K (25oC)
Note that at temperatures above and below this, despite changes in pH, water is still a neutral substance as its H+(aq) concentration is equal to its OH-(aq) concentration. (Neither acidic or basic!)
Temperature should always be stated alongside pH measurements as Kw is temperature dependent!
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Calculating [H+] and [OH-] of pure water:
Kw = [H+][OH-] = 1.00x10-14 mol2 dm-6
Since when pure, [H+] = [OH-] [H+]2 = 1.00x10-14
[H+] = √1.00x10-14 = 1.00x10-7 mol dm-3
Kw varies with temperature (because it’s an equilibrium constant): At 273 K, Kw = 1.14x10-15, calculate [H+] At 373 K, Kw = 5.13x10-13, calculate [OH-] Do these changes mean the self-dissociation of water is endothermic or
exothermic? Justify your answer.
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Calculating [H+] and [OH-] of strong acids Must use the equilibrium
For example, what is the concentration of OH- in 2.00 mol dm-3 sulphuric acid solution? Calculate H+ from the data given in the question, there is a small effect from
the equilibrium but it can be ignored.
Since H2SO4 produces two protons: [H+] = 2 x 2.00 = 4.00 mol dm-3
Now we use the ionic product of water: [H+][OH-] = 1.00x10-14
[OH-] = 1.00x10-14 / [H+] = 1.00x10-14 / 4.00= 2.50x10-15 mol dm-3
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Calculating [H+] and [OH-] of strong bases Must use the equilibrium
For example, what is the concentration of H+ in 0.150 mol dm-3 sodium hydroxide acid solution? Calculate OH- from the data given in the question, there is a small effect from
the equilibrium but it can be ignored.
Since NaOH only produces one hydroxide: [OH-] = 0.150 mol dm-3
Now we use the ionic product of water: [H+][OH-] = 1.00x10-14
[H+] = 1.00x10-14 / [OH-] = 1.00x10-14 / 0.150= 6.67x10-14 mol dm-3
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pH and pOH
You are familiar with the pH scale, based on [H+]:
0 (very strong acid) 7 (neutral) 14 (very strong alkali)
There is an analogue called pOH based on [OH-]:
0 (very strong alkali) 7 (neutral) 14 (very strong acid)
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pH and pOH scales are inter-related pH scales allow for simplified expression of H+ concentration in a solution.
Like H+ ions, OH- ions are often present in low concentrations so negative exponents can be awkward to work with.
The parallel scale known as pOH scale can describe the OH- content of solutions
pOH = -log10[OH-] pH = -log10[H+] [OH-] = 10-pOH [H+] = 10-pH
REMEMBER: Change in one unit of pH or pOH represents a 10x change in [H+] or [OH-]
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pOH = -log10[OH-] pH = -log10[H+]
[OH-] = 10-pOH [H+] = 10-pH
[H+][OH-] = Kw = 1.00 x 10-14 (at 298K), it follows that: 10-ppH x 10-ppOH = 1.00 x 10-14 (at 298K) By taking the negative logarithm to base 10 of both sides, we get pH + pOH = 14.00 (at 298K)
Relationship between [H+], [OH-], pH, and pOH at 298K:
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In the same way as the negative logarithms to base 10 of H+ and OH- are known as pH and pOH respectively, the same can be applied to Kw to derive pKw
pKw = -log10(Kw)
Kw = 10-pKw
So we can rewrite the expression above in the form that will apply to all temperatures:
pH + pOH = pKw
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Converting H+ and OH- into pH and pOH
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Strong acids and bases: pH and pOH can be deduced from their concentrations We assume full dissociation for strong acids and bases. We can deduce the ion concentrations and so calculate the pH or pOH directly
from the initial concentration of solution
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Calculating the pH of a strong base
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Calculations of strong base pH
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pH calculations summary
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pH calculations
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Calculating pH and pOH of strong acids
pH = -log10[H+] AND pOH = -log10[OH-]
For example, what is the concentration of pH and pOH of 2.00 mol dm-3 sulphuric acid solution?
Step 1: pH = -log10[H+] = -log10(4.00) = -0.602 pH + pOH = 14.00
Step 2: pOH = -log10[OH-] = -log10(2.5x10-15)= 14.6 [OH-] = 10-14.6 = 2.5x10-
15
Note: pH + pOH = 14*…..this allows us to take a short cut:
pOH = 14 – pH = 14 – (-0.602) = 14.6
pH = 14 – pOH = 14 – 14.6 = -0.602
*This ‘14’ is known as pKw, i.e. –log10(1.00x10-14)
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Calculating pH and pOH of strong bases
pH = -log10[H+] AND pOH = -log10[OH-]
For example, what is the concentration of pH and pOH of 0.150 mol dm-3 sodium hydroxide acid solution?
Step 1: pOH = -log10[OH-] = -log10(0.150)= 0.824 pH + pOH = 14.00
Step 2: pH = -log10[H+] = -log10(6.67x10-14) = 13.2 [H+] = 10-13.2 = 6.67x10-14
Note: pH + pOH = 14*…..this allows us to take a short cut:
pOH = 14 – pH = 14 – (13.2) = 0.824
pH = 14 – pOH = 14 – 0.824 = 13.2
*This ‘14’ is known as pKw, i.e. –log10(1.00x10-14)
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Solutions
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Calculating pH and pOH
You will need to calculate the pH of a variety of mixtures of solutions and then make those solutions to test them.
Instructions can be found here
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Calculating [H+] and [OH-] Very simple:
[H+] = 10-pH
For example; solution of pH 6.2 [H+] = 10-6.2 = 6.3x10-7 mol dm-3
[OH-] = 10-pOH
For example; solution of pH 6.2 pOH = 14 - 6.2 = 7.8 [OH-] = 10-7.8 = 1.6x10-8 mol dm-3
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Key Points
Kw = [H+][OH-] = 1.00x10-14
pH = -log10[H+] = 14 - pOH
pOH = -log10[OH-] = 14 - pH